The midpoint of the hypotenuse equidistant from all the vertices
To find the midpoint of the line segment with endpoints 16 and -34, you can use the midpoint formula, which is ((x_1 + x_2) / 2). Here, (x_1 = 16) and (x_2 = -34). Thus, the midpoint is ((16 + (-34)) / 2 = (-18) / 2 = -9). Therefore, the midpoint of the line segment is -9.
34 is the midpoint between 12 and 56.
34/61 is in its simplest form.
34 + 61 - 64 + 18 = 13
129
Endpoints: (-2,-2) and (4, 6) Midpoint: (1, 2)
Endpoints: (1, -6) and (-3, 4) Midpoint: (-1, -1)
61
55.7%
The GCF is 1.
Endpoints: (1, -6) and (-3, 4) Midpoint: (-1, -1)
34